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CL001 : isogonal central nK cubics CL002 : isotomic central nK cubics CL003 : isogonal strophoids CL004 : isogonal nK60 cubics CL005 : isotomic nK60 cubics CL006 : pK60+ cubics CL007 : pK(W, W) cubics, parallel tripolars cubics CL008 : perpendicular tripolars cubics CL009 : pK(W, G/W) cubics CL010 : Allardice (first) cubics CL011 : Allardice (second) cubics CL012 : Central nK cubics with center G CL013 : Central nK cubics with center O CL014 : Kp cubics, locus of pivots of pK+ with given pole CL015 : Kc cubics, locus of common points of the asymptotes of Kp cubics CL016 : Kp++ cubics CL017 : Kw cubics, locus of poles of pK+ with given pivot CL018 : Kc' cubics, locus of common points of the asymptotes of Kw cubics CL019 : pK(W, H) cubics CL020 : Equal power cubics CL021 : pK(W, O) cubics CL022 : nK0(W, K) cubics CL023 : pK(W^2, W÷H) cubics CL024 : pK(W, W÷H) cubics CL025 : Isogonal focal nK0s or Z+(O) cubics CL026 : nK0(W, W) cubics CL027 : Isogonal axial focal cubics CL028 : Non-isogonal focal nKs CL029 : Tridents CL030 : Stothers cubics CL031 : cK0(#X2, Rinf) CL032 : Hirst pivotal cubics CL033 : Deléham cubics CL034 : Evans pencil CL035 : Circular pKs CL036 : Point pedal cubics CL037 : Cundy-Parry cubics CL038 : Non-isogonal circum-strophoids CL039 : Droz-Farny cubics CL040 : Thomson centroidal cubics CL041 : Grassmann cubics & Co CL042 : pK(P x ctP, P) CL043 : pK(P x K, P) CL044 : nK0+ and nK0++ CL045 : Tripolar centroidal cubics CL046 : cK(#Q, ocQ) CL047 : Cubics and Inconics CL048 : pK(G, P), pK(P, G) and related cubics CL049 : pK(P x ccP, P), a family of pK+ CL050 : Vertex Conjugate Cubics CL051 : Pole-Pivot Cubics – Part 1 : the circular case CL052 : Pole-Pivot Cubics – Part 2 : the equilateral case CL053 : Pole-Root Cubics – Part 1 : the circular case CL054 : Pole-Root Cubics – Part 2 : the equilateral case CL055 : Sympivotal (central) cubics CL056 : Sympivotal (axial) cubics CL057 : Axial Pivotal Cubics CL058 : Perpendicular Pivotal Cubics CL059 : pK(ctP, P) = pK(P x cP, P) or pK(Ω, taΩ) |
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